The \(C_2\)-spectrum \(\mathrm{Tmf}_1(3)\) and its invertible modules
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Publication:2398908
DOI10.2140/agt.2017.17.1953zbMath1421.55002arXiv1507.08115OpenAlexW3125018279MaRDI QIDQ2398908
Michael A. Hill, Lennart Meier
Publication date: 21 August 2017
Published in: Algebraic \& Geometric Topology (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1507.08115
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Cites Work
- Unnamed Item
- Unnamed Item
- On the homotopy of \(Q(3)\) and \(Q(5)\) at the prime 2
- Duality for topological modular forms
- The homology of \(\mathrm{tmf}\)
- The Picard group of topological modular forms via descent theory
- A modular description of the \(K(2)\)-local sphere at the prime 3
- Motivic Landweber exactness
- Operadic multiplications in equivariant spectra, norms, and transfers
- On the existence of a \(v_2^{32}\)-self map on \(M(1,4)\) at the prime 2
- Topological modular forms of level 3
- Stable reflexive sheaves
- The equivariant slice filtration: a primer
- Vector bundles on the moduli stack of elliptic curves
- The stack of formal groups in stable homotopy theory
- Modular functions of one variable. II. Proceedings international summer school, University of Antwerp, RUCA. July 17-August 3, 1972
- Invertible modules for commutative \(\mathbb S\)-algebras with residue fields
- On the nonexistence of elements of Kervaire invariant one
- Model Categories of Diagram Spectra
- EQUIVARIANT ANDERSON DUALITY AND MACKEY FUNCTOR DUALITY
- Strictly Commutative Realizations of Diagrams Over the Steenrod Algebra and Topological Modular Forms at the Prime 2
- Equivariant orthogonal spectra and 𝑆-modules
- Realizing Families of Landweber Exact Homology Theories
- EQUIVARIANT UNIVERSAL COEFFICIENT AND KÜNNETH SPECTRAL SEQUENCES
- A Survey of Elliptic Cohomology
- Arithmetic Moduli of Elliptic Curves. (AM-108)
- Axiomatic stable homotopy theory
- Affineness and chromatic homotopy theory
- ARITHMETIC MODULI OF GENERALIZED ELLIPTIC CURVES
- Galois extensions of structured ring spectra. Stably dualizable groups
- Higher Topos Theory (AM-170)
- K-THEORY AND REALITY
- Conjugations on complex manifolds and equivariant homotopy of 𝑀𝑈
- Real-oriented homotopy theory and an analogue of the Adams-Novikov spectral sequence
- Topological modular forms with level structure
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