Department of Mathematics2024-12-2920241937-065210.2140/ant.2024.18.6852-s2.0-85186447637https://doi.org/10.2140/ant.2024.18.685https://hdl.handle.net/20.500.14288/21981We construct infinitesimal invariants of thickened one dimensional cycles in three dimensional space, which are the simplest cycles that are not in the Milnor range. This generalizes Park’s work on the regulators of additive cycles. The construction also allows us to prove the infinitesimal version of the strong reciprocity conjecture for thickenings of all orders. Classical analogs of our invariants are based on the dilogarithm function and our invariant could be seen as their infinitesimal version. Despite this analogy, the infinitesimal version cannot be obtained from their classical counterparts through a limiting process.HomologyDilogarithmK-theoryJournal article1944-78331205561400002Q240095