The College of Wooster Libraries Open Works Senior Independent Study Theses 2015 I Don't Play Chess: A Study of Chess Piece Generating Polynomials Stephen R. Skoch The College of Wooster, [email protected] Follow this and additional works at:https://openworks.wooster.edu/independentstudy Part of theDiscrete Mathematics and Combinatorics Commons Recommended Citation Skoch, Stephen R., "I Don't Play Chess: A Study of Chess Piece Generating Polynomials" (2015).Senior Independent Study Theses. Paper 6559. https://openworks.wooster.edu/independentstudy/6559 This Senior Independent Study Thesis Exemplar is brought to you by Open Works, a service of The College of Wooster Libraries. It has been accepted for inclusion in Senior Independent Study Theses by an authorized administrator of Open Works. For more information, please contact [email protected]. © Copyright 2015 Stephen R. Skoch on t lay hess I D ’ P C : tudy of hess iece A S C P enerating olynomials G P ndependent tudy hesis I S T PresentedinPartialFulfillmentofthe RequirementsfortheDegreeBachelorofArtsin theDepartmentofMathematicsandComputer ScienceatTheCollegeofWooster by StephenSkoch TheCollegeofWooster 2015 Advisedby: Dr. MatthewMoynihan Abstract Thisindependentstudyexaminescountingproblemsofnon-attackingrook, andnon-attackingbishopplacements. Weexamineboardsforrookand bishopplacementwithrestrictedpositionsandvarieddimensions. Inthis investigation,wediscussthegeneralformulaofageneratingfunctionfor unrestricted,squarebishopboardsthatreliesontheStirlingnumbersofthe secondkind. Wediscussthemaximumnumberofbishopswecanplaceona rectangularboard,aswellasabriefinvestigationofnon-attackingrook placementsonthree-dimensionalboards,drawingaconnectiontolatin squares. iii Dedication Tomyparents, foralloftheirmanysacrificestogivemeaneducation. Thiswasonlypossiblebecauseofyou. v Acknowledgements Iwouldliketotakethistimetothankmyadvisor,Dr. Moynihan,forhis patience,encouragement,andguidancethroughouttheprocessofwritingthis independentstudy. Icannotexpressmygratitudeforallofyourhelpand beliefinmyabilities. ThankyoutoDr. Pierce,whogavemesomuchguidance andsupportthroughoutmyyearsatthecollege. Iwouldalsoliketothankthe entireMathematicsdepartmentatTheCollegeofWoosterforbeingsohelpful andapproachable. Inaddition,Iwouldliketothankallofthewonderful friendsIhavemadeatWoosterwhohavealwaysbeenthereforme. Youhave alltaughtmesomuchandkeptmegrounded. Iamsogratefulforeachand everymemory,andIamlookingforwardtoseeingallofyouchangethe world. Mostimportantly,Iwouldliketothankmyparentsforbeingaconstant sourceoflove,support,andwisdomthroughouteveryaspectofmylife. vii Contents Abstract iii Dedication v Acknowledgements vii 1 Introduction 1 2 RookBoardsofTwoDimensions 5 3 TheProblemoftheBishops 27 3.1 The Maximal Number of Bishops and Bishop Placements on SquareBoards . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 27 3.1.1 SquareBishopBoardswhennisEven . . . . . . . . . . . . 31 3.1.2 SquareBishopBoardswhennisOdd . . . . . . . . . . . . 34 3.2 TheGeneralBishopPolynomialforSquareBoards . . . . . . . . . 41 3.2.1 ThePolynomialB (x)whennisEven . . . . . . . . . . . . 45 n 3.2.2 ThePolynomialB (x)whennisOdd . . . . . . . . . . . . . 52 n ix