| #2 |  Quantum Field Theory: An Integrated Approach
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| #3 |  Introduction to Quantum Field Theory with Applications to Quantum Gravity Introduction to Quantum Field Theory with Applications to Quantum Gravity
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| #4 |  Lecture Notes on Newtonian Mechanics: Lessons from Modern Concepts
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| #5 |  A Primer in Tensor Analysis and Relativity
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| #6 |  Quantum Field Theory for the Gifted Amateur
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| #7 |  General Relativity: The Essentials
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| #8 |  Covariant Loop Quantum Gravity Covariant Loop Quantum Gravity
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| #9 |  Quantum Theory for Mathematicians
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| #10 |  An Introduction to Homological Algebra
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| #11 |  Quantum Mechanics for Pedestrians 1: Fundamentals
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| #12 |  Quantum Mechanics for Pedestrians 2: Applications and Extensions
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| #13 |  Classical Mechanics: Hamiltonian and Lagrangian Formalism
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| #14 |  An introduction to homological algebra
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| #15 |  No-Nonsense Quantum Field Theory No-Nonsense Quantum Field Theory: A Student-Friendly Introduction
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| #16 |  Student Friendly Quantum Field Theory Volume 1: Basic Principles and Quantum Electrodynamics
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| #17 |  Visual Differential Geometry and Forms: A Mathematical Drama in Five Acts
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| #18 |  A Visual Introduction to Differential Forms and Calculus on Manifolds
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| #19 |  A First Course in Differential Geometry: Surfaces in Euclidean Space
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| #20 |  From Differential Geometry to Non-commutative Geometry and Topology
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| #21 |  A Course in Homological Algebra
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| #22 |  What Is a Quantum Field Theory?: A First Introduction for Mathematicians
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| #23 |  Physics From Symmetry
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| #24 |  Exterior Algebras: Elementary Tribute to Grassmann's Ideas
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| #25 |  Smooth Manifolds
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| #26 |  A First Course in Noncommutative Rings
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| #27 |  Lie Groups, Lie Algebras, and Representations: An Elementary Introduction
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| #28 |  The Quantum Mechanics Conundrum: Interpretation and Foundations
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| #29 |  Do We Really Understand Quantum Mechanics?
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