On the functional definition of concepts and linguistic meanings: the embodied/grounded approach
The article suggests a way to overcome two well-known problems of embodied/grounded theory of cognition: the impossibility of strict differentiating modal and amodal symbols, and the difficulty in defining abstract concepts/simulators (abstract lexical meanings). The proposed functional approach is based on the dichotomy 'perceptual (external) ...
Space and Time as A Priori Forms in the Works of Hermann Cohen and Ivan Lapshin
In the late nineteenth and early twentieth centuries the need to rethink the status of space and time which Kant considered to be a priori forms of sensibility was prompted by the emergence of new approaches to the methodology of scientific cognition. In neo-Kantian interpretation these cognitive forms acquire a special epistemological status, manifesting themselves in theoretical research as “pre-given” foundations of knowledge. It seems necessary to conduct a comparative analysis of ...
“The Turn towards Ontology” in Russian Neo-Kantianism in the Late 1910s and Early 1920s (Lev Salagov and Nikolai Boldyrev)
... Neo-Kantians Lev Salagov and Nikolai Boldyrev. Their philosophical concepts share the tendency to transpose epistemological problems to ontology, and to identify and bring closer together epistemology and ontology. Russian philosophers ontologise the theory of cognition through the analysis of subjectivity, the complete elimination of psychological motives and the separation of transcendentalism from transcendentism. These principles enable Salagov to ground a three-part structure of cognition (consciousness,...
A transcendental analysis of mathematics: The abstract nature of mathematical knowledge
Kant’s transcendental philosophy (transcendentalism) focuses on both the human method of cognition in general [CPR, B25] and certain types of cognition aimed at justifying their objective significance. This article aims to explicate Kant’s understanding (resp. justification) of the abstract nature of mathematical knowledge (cognition) as ...
A transcendental analysis of mathematics: The constructive nature of mathematics
Kant’s transcendental philosophy (transcendentalism) focuses on both the human method of cognition in general [CPR, B 25] and certain types of cognition aimed at justifying their objective significance. This article aims to explicate Kant’s understanding (resp. justification) of the abstract nature of mathematical knowledge (cognition) ...
