For math I have some stuff I had my old tutor recommended me.
Undergraduate Core:
A Concise Introduction to Pure Mathematics (Martin Liebeck) -
Analysis I (Terrence Tao) -
Linear Algebra Done Right (Axler)
A Book of Abstract Algebra (Pinter)
Introduction to Metric & Topological Spaces (Sutherland)
Analysis II (Terrence Tao)
Princeton Lectures Book 2 - Complex Analysis (Stein & Shakarchi)
Undergrad Extras:
An Infinitely Large Napkin (Evan Chen) - A rapid introduction to many fields of math at the undergraduate and graduate level. Heavily recommend supplementing the undergrad core reading with this.
An Invitation to Ergodic Theory (Silva) -
A sampling of Remarkable Groups (Bonanone et al.) -
Lectures on Fractal Geometry and Dynamical Systems (Pesin and Climenhaga) -
Geometric Group Theory (Loh) - An introduction to the study of groups using geometric/metric techniques.
The Knot Book (Colins) - A very informal introduction to knot theory.
Ramsey Theory on the Integers (Landman and Robertson)
Graduate Core:
Algebra Ch. 0 (Aluffi) - Graduate level Algebra.
An introduction to Measure Theory (Tao) or Measure Theory, Integration and Hilbert spaces (Stein and Shakarchi) - Graduate level real analysis, part 1.
An Epsilon of Room (Tao) - Graduate level real analysis part 2. Includes more on measures and some functional analysis.
Vector Analysis (Janich) or An introduction to manifolds (Tu) - Smooth manifolds.
Linear Analysis (Bella Bollobas) - Functional analysis.
Algebraic Topology (Munkres)
Topology from the Differentiable Viewpoint (Milnor) - Differential topology.
Graduate Extras:
Probability Essentials (Jacod & Protter) - Has measure theory as a prerequisite.
Brownian Motion, Martingales and Stochastic Calculus (Le Gall) - Stochastic processes & calculus. Has measure theoretic probability and functional analysis as a prerequisite.
Princeton Lectures Book 1 and 4 (Stein & Shakarchi) - 1 covers
Introduction to Dynamical Systems (Brin and Stuck) - General overview of dynamical systems, highly recommended.
Introduction to the Modern Theory of Dynamical Systems (Katok Hasselblatt) - Super in depth treatment of dynamical systems, good follow up to the above.
Introduction to 3-Manifolds (Jennifer Schultens) -
Introduction to Riemannian Geometry (Lee) -
An Introduction to Lie Groups and the Geometry of Homogeneous Spaces (Arvanitoyeorgos) - Lie theory.
Measure Theory and Fine Properties of Functions (Evans & Gariepy) -
Ergodic Theory with a view towards Number theory (Ward) -
Morse Theory (Milnor)
Differential Forms in Algebraic Topology (Bott and Tu)
For CHEMISTRY
A Primer of Drug Action, R.M. Julien, 13th ed., by Claire D. Advokat
Katzung, Bertram G., Masters, Susan B., and Trevor, Anthony J. Basic & Clinical Pharmacology, 12th edition. McGraw-Hill Profess. .
Undergraduate
Organic: Organic Chemistry as a Second Language, The art of writing reasonable organic reaction mechanisms
Inorganic: Inorganic Chemistry, Molecular Symmetry and Group Theory
Analytical: Principles of Instrumental Anlsysis, Fundamentals of Analytical Chemistry
Graduate
Organic: Advanced Practical Organic Chemistry, March's Advanced Organic Chemistry, Greene's Protective Groups in Organic Synthesis, Purification of Laboratory Chemicals, Strategic Applications of Named Reactions in Organic Synthesis
Inorganic: Advanced Inorganic Chemistry.
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This is about half my collection of math texts from undergrad and grad. Other half is boxed up for my upcoming move.
I'll write up a list of standouts and a response to your recommendations at lunch.
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Thanks!
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