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Plural Quantification Exposed ⋮ FOR BETTER AND FOR WORSE. ABSTRACTIONISM, GOOD COMPANY, AND PLURALISM ⋮ Frege, Boolos, and logical objects ⋮ Book review of: G. Frege, Basic laws of arithmetic. Derived using concept-script. Volume 1 and 2. Edited by Philip A. Ebert and Marcus Rossberg. ⋮ FREGE MEETS BROUWER (OR HEYTING OR DUMMETT) ⋮ RELATIVE CATEGORICITY AND ABSTRACTION PRINCIPLES ⋮ Frege's cardinals as concept-correlates ⋮ Neologicist nominalism ⋮ To be is to be the object of a possible act of choice ⋮ LOGICISM, INTERPRETABILITY, AND KNOWLEDGE OF ARITHMETIC ⋮ Towards a pluralist theory of singular thought ⋮ THE STRENGTH OF ABSTRACTION WITH PREDICATIVE COMPREHENSION ⋮ Grounding and auto-abstraction ⋮ Reference for neo-Fregeans ⋮ Potential infinity, abstraction principles and arithmetic (Leśniewski style) ⋮ Identity and the cognitive value of logical equations in Frege's foundational project ⋮ HUME’S PRINCIPLE, BAD COMPANY, AND THE AXIOM OF CHOICE ⋮ Wittgenstein, Russell, and Our Concept of the Natural Numbers ⋮ The adverbial theory of numbers: some clarifications ⋮ Hume's principle: a plea for austerity ⋮ What did Frege take Russell to have proved? ⋮ The Status of Value-ranges in the Argument of Basic Laws of Arithmetic I §10 ⋮ Comparing Peano arithmetic, Basic Law V, and Hume's Principle ⋮ Natural numbers and natural cardinals as abstract objects: A partial reconstruction of Frege's \textit{Grundgesetze} in object theory ⋮ A strengthening of the Caesar problem ⋮ Ontological realism and sentential form ⋮ The Modal Status of Contextually A Priori Arithmetical Truths ⋮ Philosophy of mathematics: Prospects for the 1990s ⋮ Mathematical contingentism ⋮ Asymptotic Quasi-completeness and ZFC ⋮ Singular terms revisited ⋮ Empiricism, probability, and knowledge of arithmetic: a preliminary defense ⋮ Where do the natural numbers come from? ⋮ Frege's theorem and his logicism ⋮ Is Hume's principle analytic? ⋮ Logic, logics, and logicism ⋮ Frege's proof of referentiality ⋮ Neo-Fregeanism: an embarrassment of riches ⋮ Predicative Fragments of Frege Arithmetic ⋮ THE CONVENIENCE OF THE TYPESETTER; NOTATION AND TYPOGRAPHY IN FREGE’SGRUNDGESETZE DER ARITHMETIK ⋮ The anatytic conception of truth and the foundations of arithmetic ⋮ Somehow things do not relate: on the interpretation of polyadic second-order logic ⋮ Size and function ⋮ THE CONCEPTHORSEIS A CONCEPT ⋮ Frege on referentiality and Julius Caesar in \textit{Grundgesetze} Section 10 ⋮ From the unity of the proposition to linguistic idealism ⋮ Bad company objection to Joongol Kim's adverbial theory of numbers ⋮ Frege's unofficial arithmetic ⋮ Atomic ontology ⋮ A metasemantic challenge for mathematical determinacy ⋮ Benacerraf, Field, and the agreement of mathematicians ⋮ What is Neologicism? ⋮ Frege, Dedekind, and the Origins of Logicism ⋮ Ramified Frege arithmetic ⋮ The truth and nothing but the truth, yet never the whole truth: Frege, Russell and the analysis of unities ⋮ A deflationary theory of reference ⋮ Double vision: two questions about the neo-Fregean program ⋮ Focus restored: Comments on John MacFarlane ⋮ Bad company and neo-Fregean philosophy ⋮ The good, the bad and the ugly ⋮ Hume's big brother: Counting concepts and the bad company objection ⋮ Introduction to the special issue on the bad company problem ⋮ Hofweber's nominalist naturalism ⋮ Rescuing implicit definition from abstractionism ⋮ Geometry and generality in Frege's philosophy of arithmetic. ⋮ IN GOOD COMPANY? ON HUME’S PRINCIPLE AND THE ASSIGNMENT OF NUMBERS TO INFINITE CONCEPTS ⋮ The development of arithmetic in Frege'sGrundgesetze der arithmetik ⋮ Cardinality, counting, and equinumerosity ⋮ On the origin and status of our conception of number ⋮ Realism and paradox ⋮ Neo-Fregean foundations for real analysis: Some reflections on Frege's constraint ⋮ Frege meets Dedekind: A neologicist treatment of real analysis