예제 #1
0
        /// <summary>
        /// Analyzes a QP with the specified computer of maximal nonzero equivalence class
        /// representatives.
        /// </summary>
        /// <typeparam name="TVertex">The type of the vertices of the quiver.</typeparam>
        /// <param name="qp">The quiver with potential.</param>
        /// <param name="settings">The settings for the analysis.</param>
        /// <param name="computer">A computer of maximal nonzero equivalence class representatives.</param>
        /// <returns>The results of the analysis.</returns>
        /// <exception cref="ArgumentNullException"><paramref name="qp"/> is
        /// <see langword="null"/>, or <paramref name="settings"/> is <see langword="null"/>,
        /// or <paramref name="computer"/> is <see langword="null"/>.</exception>
        /// <exception cref="NotSupportedException">The potential of <paramref name="qp"/> has a
        /// cycle with coefficient not equal to either of -1 and +1,
        /// or some arrow occurs multiple times in a single cycle of the potential of
        /// <paramref name="qp"/>.</exception>
        /// <exception cref="ArgumentException">For some arrow in the potential of
        /// <paramref name="qp"/> and sign, the arrow is contained in more than one cycle of that
        /// sign.</exception>
        public IQPAnalysisResults <TVertex> Analyze <TVertex>(
            QuiverWithPotential <TVertex> qp,
            QPAnalysisSettings settings,
            IMaximalNonzeroEquivalenceClassRepresentativeComputer computer)
            where TVertex : IEquatable <TVertex>, IComparable <TVertex>
        {
            if (qp is null)
            {
                throw new ArgumentNullException(nameof(qp));
            }
            if (settings is null)
            {
                throw new ArgumentNullException(nameof(settings));
            }
            if (computer is null)
            {
                throw new ArgumentNullException(nameof(computer));
            }

            // Simply get the underlying semimonomial unbound quiver and analyze it using the appropriate analyzer
            var semimonomialUnboundQuiver = SemimonomialUnboundQuiverFactory.CreateSemimonomialUnboundQuiverFromQP(qp);
            var suqAnalyzer = new SemimonomialUnboundQuiverAnalyzer();
            var suqSettings = AnalysisSettingsFactory.CreateSemimonomialUnboundQuiverAnalysisSettings(settings);
            var suqResults  = suqAnalyzer.Analyze(semimonomialUnboundQuiver, suqSettings, computer);
            var results     = AnalysisResultsFactory.CreateQPAnalysisResults(suqResults);

            return(results);
        }
예제 #2
0
        /// <summary>
        /// Analyzes a <see cref="QuiverInPlane{TVertex}"/>.
        /// </summary>
        /// <typeparam name="TVertex">The type of the vertices in the quiver.</typeparam>
        /// <param name="quiverInPlane">The quiver in plane to analyze.</param>
        /// <returns>The analysis results.</returns>
        /// <remarks>
        /// <para>If the analysis is unsuccessful, the value of the <c>MainResult</c> property
        /// of the returned analysis results does not have the
        /// <see cref="QuiverInPlaneAnalysisMainResults.Success"/> or the
        /// <see cref="QuiverInPlaneAnalysisMainResults.QPIsSelfInjective"/> flags set and has at least
        /// one of the other flags (each of which indicates some sort of failure) set. However, in
        /// the case of multiple causes for failure (e.g., the quiver has loops and anti-parallel
        /// arrows), all the corresponding flags are not necessarily set (e.g.,
        /// <see cref="QuiverInPlaneAnalysisMainResults.QuiverHasLoops"/> is set but
        /// <see cref="QuiverInPlaneAnalysisMainResults.QuiverHasAntiParallelArrows"/> is not set,
        /// or <see cref="QuiverInPlaneAnalysisMainResults.QuiverHasAntiParallelArrows"/> is set but
        /// <see cref="QuiverInPlaneAnalysisMainResults.QuiverHasLoops"/> is not set).</para>
        /// <para>This method does not throw any exceptions (unless I've forgotten something).</para>
        /// </remarks>
        public IQuiverInPlaneAnalysisResults <TVertex> Analyze <TVertex>(
            QuiverInPlane <TVertex> quiverInPlane,
            QuiverInPlaneAnalysisSettings settings)
            where TVertex : IEquatable <TVertex>, IComparable <TVertex>
        {
            if (quiverInPlane is null)
            {
                throw new ArgumentNullException(nameof(quiverInPlane));
            }

            var qpExtractor      = new QPExtractor();
            var extractionResult = qpExtractor.TryExtractQP(quiverInPlane, out var qp);

            if (extractionResult != QPExtractionResult.Success)
            {
                return(AnalysisResultsFactory.CreateQuiverInPlaneAnalysisResults <TVertex>(extractionResult));
            }

            var analyzer           = new QPAnalyzer();
            var qpAnalyzerSettings = AnalysisSettingsFactory.CreateQPAnalysisSettings(settings);
            var qpAnalysisResults  = analyzer.Analyze(qp, qpAnalyzerSettings);
            var analysisResults    = AnalysisResultsFactory.CreateQuiverInPlaneAnalysisResults(qpAnalysisResults);

            return(analysisResults);
        }
        /// <summary>
        /// Analyzes a semimonomial unbound quiver with a default computer of maximal nonzero
        /// equivalence class representatives.
        /// </summary>
        /// <typeparam name="TVertex">The type of the vertices of the quiver.</typeparam>
        /// <param name="unboundQuiver">The unbound quiver.</param>
        /// <param name="settings">The settings for the analysis.</param>
        /// <param name="computer">A computer of maximal nonzero equivalence class representatives.</param>
        /// <returns>The results of the analysis.</returns>
        /// <exception cref="ArgumentNullException"><paramref name="unboundQuiver"/> is
        /// <see langword="null"/>, or <paramref name="settings"/> is <see langword="null"/>,
        /// or <paramref name="computer"/> is <see langword="null"/>.</exception>
        /// <exception cref="NotSupportedException">The semimonomial ideal of
        /// <paramref name="unboundQuiver"/> has two distinct non-monomial generators
        /// <c>p1 - q1</c> and <c>p2 - q2</c> where <c>p1, q1, p2, q2</c> are not all distinct.</exception>
        /// <exception cref="ArgumentException">The semimonomial ideal of
        /// <paramref name="unboundQuiver"/> has a non-monomial generator <c>p - q</c> where the
        /// paths <c>p</c> and <c>q</c> do not have the same endpoints.</exception>
        public ISemimonomialUnboundQuiverAnalysisResults <TVertex> Analyze <TVertex>(
            SemimonomialUnboundQuiver <TVertex> unboundQuiver,
            SemimonomialUnboundQuiverAnalysisSettings settings,
            IMaximalNonzeroEquivalenceClassRepresentativeComputer computer)
            where TVertex : IEquatable <TVertex>, IComparable <TVertex>
        {
            if (unboundQuiver is null)
            {
                throw new ArgumentNullException(nameof(unboundQuiver));
            }
            if (settings is null)
            {
                throw new ArgumentNullException(nameof(settings));
            }
            if (computer is null)
            {
                throw new ArgumentNullException(nameof(computer));
            }

            var computationSettings           = AnalysisSettingsFactory.CreateMaximalNonzeroEquivalenceClassRepresentativeComputationSettings(settings);
            var transformationRuleTreeCreator = new TransformationRuleTreeCreator();
            var transformationRuleTree        = transformationRuleTreeCreator.CreateTransformationRuleTree(unboundQuiver);

            var maximalPathRepresentatives = new Dictionary <TVertex, IEnumerable <Path <TVertex> > >();
            var nakayamaPermutationDict    = new Dictionary <TVertex, TVertex>();

            var            mainResults = SemimonomialUnboundQuiverAnalysisMainResults.None;
            Path <TVertex> longestPath = null;

            foreach (var startingVertex in unboundQuiver.Quiver.Vertices)
            {
                var representativesResult = computer.ComputeMaximalNonzeroEquivalenceClassRepresentativesStartingAt(unboundQuiver.Quiver, startingVertex, transformationRuleTree, computationSettings);
                if (longestPath is null || representativesResult.LongestPathEncountered.Length > longestPath.Length)
                {
                    longestPath = representativesResult.LongestPathEncountered;
                }

                if (representativesResult.WeakCancellativityFailureDetected)
                {
                    mainResults |= SemimonomialUnboundQuiverAnalysisMainResults.NotWeaklyCancellative;
                }
                if (representativesResult.CancellativityFailureDetected)
                {
                    mainResults |= SemimonomialUnboundQuiverAnalysisMainResults.NotCancellative;
                }
                if (representativesResult.TooLongPathEncountered)
                {
                    mainResults |= SemimonomialUnboundQuiverAnalysisMainResults.Aborted;
                }

                if ((representativesResult.WeakCancellativityFailureDetected && settings.TerminateEarlyIfWeakCancellativityFails) ||
                    (representativesResult.CancellativityFailureDetected && settings.TerminateEarlyIfCancellativityFails) ||
                    (representativesResult.TooLongPathEncountered))
                {
                    return(new SemimonomialUnboundQuiverAnalysisResults <TVertex>(mainResults, null, null, longestPath));
                }

                var maximalNonzeroEquivalenceClassRepresentatives = representativesResult.MaximalNonzeroEquivalenceClassRepresentatives;
                maximalPathRepresentatives[startingVertex] = maximalNonzeroEquivalenceClassRepresentatives;
                int numMaximalNonzeroPathClasses = maximalNonzeroEquivalenceClassRepresentatives.Count();
                Debug.Assert(numMaximalNonzeroPathClasses > 0, "Analysis with starting vertex found 0 maximal nonzero classes.");
                if (numMaximalNonzeroPathClasses > 1)
                {
                    mainResults |= SemimonomialUnboundQuiverAnalysisMainResults.MultipleMaximalNonzeroClasses;
                    if (settings.TerminateEarlyOnMultiDimensionalSocle)
                    {
                        return(new SemimonomialUnboundQuiverAnalysisResults <TVertex>(mainResults, null, null, longestPath));
                    }
                }
                else
                {
                    var endingPoint = maximalNonzeroEquivalenceClassRepresentatives.Single().EndingPoint;
                    // Check if the tentative Nakayama permutation fails to be injective.
                    if (nakayamaPermutationDict.ContainsValue(endingPoint))
                    {
                        mainResults |= SemimonomialUnboundQuiverAnalysisMainResults.NonInjectiveTentativeNakayamaPermutation;
                        if (settings.TerminateEarlyIfNakayamaPermutationFails)
                        {
                            return(new SemimonomialUnboundQuiverAnalysisResults <TVertex>(mainResults, null, null, longestPath));
                        }
                    }
                    else
                    {
                        nakayamaPermutationDict[startingVertex] = endingPoint;
                    }
                }
            }

            mainResults |= SemimonomialUnboundQuiverAnalysisMainResults.Success;
            NakayamaPermutation <TVertex> nakayamaPermutation = null;

            if (mainResults.IndicatesSelfInjectivity())
            {
                nakayamaPermutation = new NakayamaPermutation <TVertex>(nakayamaPermutationDict);
            }

            return(new SemimonomialUnboundQuiverAnalysisResults <TVertex>(mainResults, maximalPathRepresentatives, nakayamaPermutation, longestPath));
        }
        /// <summary>
        /// Analyzes a semimonomial unbound quiver in a way that utilizes the
        /// &quot;periodicity&quot; of the unbound quiver and concurrently.
        /// The analysis is done using a specified computer of maximal nonzero
        /// equivalence class representatives.
        /// </summary>
        /// <typeparam name="TVertex">The type of the vertices of the quiver.</typeparam>
        /// <param name="unboundQuiver">The unbound quiver.</param>
        /// <param name="periods">A collection of consecutive non-empty periods of the unbound
        /// quiver that are jointly exhaustive and mutually exclusive.</param>
        /// <param name="settings">The settings for the analysis.</param>
        /// <param name="computer">A computer of maximal nonzero equivalence class representatives.</param>
        /// <returns>The results of the analysis.</returns>
        /// <exception cref="ArgumentNullException"><paramref name="unboundQuiver"/> is
        /// <see langword="null"/>,
        /// or <paramref name="periods"/> is <see langword="null"/>
        /// or <paramref name="settings"/> is <see langword="null"/>,
        /// or <paramref name="computer"/> is <see langword="null"/>.</exception>
        /// <exception cref="NotSupportedException">The semimonomial ideal of
        /// <paramref name="unboundQuiver"/> has two distinct non-monomial generators
        /// <c>p1 - q1</c> and <c>p2 - q2</c> where <c>p1, q1, p2, q2</c> are not all distinct.</exception>
        /// <exception cref="ArgumentException">The semimonomial ideal of
        /// <paramref name="unboundQuiver"/> has a non-monomial generator <c>p - q</c> where the
        /// paths <c>p</c> and <c>q</c> do not have the same endpoints,
        /// or some of the periods in <paramref name="periods"/> overlap, or the union of all
        /// periods in <paramref name="periods"/> is not precisely the collection of all vertices
        /// in the quiver.</exception>
        /// <remarks>
        /// <para>Some validation of <paramref name="periods"/> is done, but
        /// <paramref name="periods"/> is not verified to constitute a sequence of consecutive
        /// &quot;periods&quot; of the unbound quiver.</para>
        /// </remarks>
        public ISemimonomialUnboundQuiverAnalysisResults <TVertex> AnalyzeUtilizingPeriodicityConcurrently <TVertex>(
            SemimonomialUnboundQuiver <TVertex> unboundQuiver,
            IEnumerable <IEnumerable <TVertex> > periods,
            SemimonomialUnboundQuiverAnalysisSettings settings,
            IMaximalNonzeroEquivalenceClassRepresentativeComputer computer)
            where TVertex : IEquatable <TVertex>, IComparable <TVertex>
        {
            if (unboundQuiver is null)
            {
                throw new ArgumentNullException(nameof(unboundQuiver));
            }
            if (periods is null)
            {
                throw new ArgumentNullException(nameof(periods));
            }
            if (settings is null)
            {
                throw new ArgumentNullException(nameof(settings));
            }
            if (computer is null)
            {
                throw new ArgumentNullException(nameof(computer));
            }

            var computationSettings           = AnalysisSettingsFactory.CreateMaximalNonzeroEquivalenceClassRepresentativeComputationSettings(settings);
            var transformationRuleTreeCreator = new TransformationRuleTreeCreator();
            var transformationRuleTree        = transformationRuleTreeCreator.CreateTransformationRuleTree(unboundQuiver);

            // Remark: We cannot terminate before the CreateTransformationRuleTree method is called,
            // because it is responsible for throwing an ArgumentException.
            var verticesInPeriods = new HashSet <TVertex>();

            foreach (var period in periods)
            {
                if (period.Any(vertex => verticesInPeriods.Contains(vertex)))
                {
                    throw new ArgumentException("The periods overlap.");
                }

                verticesInPeriods.UnionWith(period);
            }

            var quiver = unboundQuiver.Quiver;

            if (!quiver.Vertices.SetEquals(verticesInPeriods))
            {
                throw new ArgumentException("The union of the periods is not the collection of all vertices in the quiver.");
            }

            var maximalPathRepresentativesDict = new ConcurrentDictionary <TVertex, IEnumerable <Path <TVertex> > >();
            var nakayamaPermutationDict        = new ConcurrentDictionary <TVertex, TVertex>();

            if (!periods.Any())
            {
                return(ExtendResultForPeriodToEntireQuiver(
                           periods,
                           maximalPathRepresentativesDict,
                           nakayamaPermutationDict,
                           null,
                           false,
                           false,
                           false,
                           false,
                           false));
            }

            // The period of the vertices whose socles to investigate.
            var firstPeriod = periods.First();

            // The period into which all the analyzed vertices are mapped by the tentative Nakayama permutation.
            ISet <TVertex> targetPeriod = null;

            // These aren't used, are they?
            var cts     = new CancellationTokenSource();
            var options = new ParallelOptions()
            {
                CancellationToken = cts.Token
            };

            // Variable into which to put the output of the execution that doesn't go into the
            // some other variable (maximalPathRepresentatives and nakayamaPermutationDict).
            // Called globalState because it aggregates all the local states.
            var globalState = (
                longestPath : (Path <TVertex>)null,
                nonCancellativityDetected : false,
                tooLongPathEncountered : false,
                multiDimensionalSocleEncountered : false,
                permutationFails : false,
                cancelledEarly : false);
            var globalStateLock = new object();

            Parallel.ForEach(
                // The enumerable to iterate over.
                firstPeriod,
                // Options for the parallel execution, used to pass a cancellation token.
                options,
                // localInit delegate used to get the initial value of localState for each task/"thread".
                () => (
                    longestPath: (Path <TVertex>)null,
                    nonCancellativityDetected: false,
                    tooLongPathEncountered: false,
                    multiDimensionalSocleEncountered: false,
                    permutationFails: false,
                    cancelledEarly: false),
                // body delegate that contains the loop body.
                (startingVertex, loopState, localState) =>
            {
                if (loopState.ShouldExitCurrentIteration)
                {
                    return(localState);
                }

                var representativesResult = computer.ComputeMaximalNonzeroEquivalenceClassRepresentativesStartingAt(unboundQuiver.Quiver, startingVertex, transformationRuleTree, computationSettings);
                if (localState.longestPath is null || representativesResult.LongestPathEncountered.Length > localState.longestPath.Length)
                {
                    localState.longestPath = representativesResult.LongestPathEncountered;
                }

                if (representativesResult.CancellativityFailureDetected)
                {
                    localState.nonCancellativityDetected = true;
                    if (settings.TerminateEarlyIfCancellativityFails)
                    {
                        localState.cancelledEarly = true;
                        loopState.Stop();
                    }
                }

                if (representativesResult.TooLongPathEncountered)
                {
                    localState.tooLongPathEncountered = true;
                    localState.cancelledEarly         = true;
                    loopState.Stop();
                }

                if (loopState.ShouldExitCurrentIteration)
                {
                    return(localState);
                }

                var maximalNonzeroEquivalenceClassRepresentatives = representativesResult.MaximalNonzeroEquivalenceClassRepresentatives;
                maximalPathRepresentativesDict[startingVertex]    = maximalNonzeroEquivalenceClassRepresentatives;
                int numMaximalNonzeroPathClasses = maximalNonzeroEquivalenceClassRepresentatives.Count();
                if (numMaximalNonzeroPathClasses > 1)
                {
                    localState.multiDimensionalSocleEncountered = true;
                    if (settings.TerminateEarlyOnMultiDimensionalSocle)
                    {
                        localState.cancelledEarly = true;
                        loopState.Stop();
                        return(localState);
                    }
                }

                var endingPoint = maximalNonzeroEquivalenceClassRepresentatives.Single().EndingPoint;
                lock (nakayamaPermutationDict)
                {
                    // If this was the first vertex analyzed, set the target period.
                    if (targetPeriod is null)
                    {
                        targetPeriod = periods.First(period => period.Contains(endingPoint)).ToSet();
                    }
                    // Else check that the current vertex is mapped into the same period as the first vertex.
                    // If not, there cannot be a Nakayama permutation.
                    else if (!targetPeriod.Contains(endingPoint))
                    {
                        localState.permutationFails = true;
                        if (settings.TerminateEarlyIfNakayamaPermutationFails)
                        {
                            localState.cancelledEarly = true;
                            loopState.Stop();
                            return(localState);
                        }
                    }

                    // If the current vertex maps to a vertex to which some other vertex have
                    // already been mapped.
                    // If not, there cannot be a Nakayama permutation.
                    if (nakayamaPermutationDict.Values.Contains(endingPoint))
                    {
                        localState.permutationFails = true;
                        if (settings.TerminateEarlyIfNakayamaPermutationFails)
                        {
                            localState.cancelledEarly = true;
                            loopState.Stop();
                            return(localState);
                        }
                    }

                    nakayamaPermutationDict[startingVertex] = endingPoint;
                    return(localState);
                }
            },
                // localFinally delegate used to output the local states to the outside.
                localState =>
            {
                lock (globalStateLock)
                {
                    if (globalState.longestPath is null ||
                        (localState.longestPath != null && localState.longestPath.Length > globalState.longestPath.Length))
                    {
                        globalState.longestPath = localState.longestPath;
                    }

                    if (localState.tooLongPathEncountered)
                    {
                        globalState.tooLongPathEncountered = true;
                    }
                    if (localState.nonCancellativityDetected)
                    {
                        globalState.nonCancellativityDetected = true;
                    }
                    if (localState.multiDimensionalSocleEncountered)
                    {
                        globalState.multiDimensionalSocleEncountered = true;
                    }
                    if (localState.permutationFails)
                    {
                        localState.permutationFails = true;
                    }
                    if (localState.cancelledEarly)
                    {
                        globalState.cancelledEarly = true;
                    }
                }
            });

            return(ExtendResultForPeriodToEntireQuiver(
                       periods,
                       maximalPathRepresentativesDict,
                       nakayamaPermutationDict,
                       globalState.longestPath,
                       globalState.tooLongPathEncountered,
                       globalState.nonCancellativityDetected,
                       globalState.multiDimensionalSocleEncountered,
                       globalState.permutationFails,
                       globalState.cancelledEarly));
        }