Hooper, Patrick - Department of Mathematics, City College, City University of New York

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Hooper, Patrick - Department of Mathematics, City College, City University of New York

Introduction to McBilliards W. Patrick Hooper and Richard Evan Schwartz
Periodic billiard paths in right triangles are W. Patrick Hooper
Introduction to McBilliards W. Patrick Hooper and Richard Evan Schwartz #
Stable periodic billiard paths in obtuse isosceles triangles
List of my results W. Patrick Hooper
FROM PAPPUS' THEOREM TO THE TWISTED CUBIC W. PATRICK HOOPER
THE BOUW-MOLLER LATTICE SURFACES AND EIGENVECTORS OF GRID GRAPHS
THE INVARIANT MEASURES OF SOME INFINITE INTERVAL EXCHANGE MAPS
TRUCHET TILINGS AND RENORMALIZATION W. PATRICK HOOPER
DYNAMICS ON AN INFINITE SURFACE WITH THE LATTICE PROPERTY
GRID GRAPHS AND LATTICE SURFACES W. PATRICK HOOPER
NOTES ON DEFORMING THE STAIRCASE SURFACE The intuitive idea is that if two (infinite) translation surfaces have "large" affine automor-
RENORMALIZATION OF POLYGON EXCHANGE MAPS ARISING FROM CORNER PERCOLATION
List of my results W. Patrick Hooper
RESEARCH REPORT: A FAMILY OF RENORMALIZABLE POLYGON EXCHANGE MAPS
DYNAMICS ON THE INFINITE STAIRCASE W. PATRICK HOOPER, PASCAL HUBERT, AND BARAK WEISS
On the stability of periodic billiard paths in A Dissertation, Presented
Topologically billiard-like paths in triangles W. Patrick Hooper
Stable periodic billiard paths in obtuse isosceles triangles
GENERALIZED STAIRCASES: RECURRENCE AND SYMMETRY W. PATRICK HOOPER
Introduction to McBilliards W. Patrick Hooper and Richard Evan Schwartz
A NOTE ON COMPARING NUMBERS IN A REAL ALGEBRAIC FIELD W. PATRICK HOOPER
Billiards in Nearly Isosceles Triangles W. Patrick Hooper
Periodic billiard paths in right triangles are W. Patrick Hooper
ANOTHER VEECH TRIANGLE W. PATRICK HOOPER
Lower bounds on growth rates of periodic billiard trajectories in some irrational polygons
AN INFINITE SURFACE WITH THE LATTICE PROPERTY I: VEECH GROUPS AND CODING GEODESICS